Regularity for degenerate two-phase free boundary problems

Abstract

We provide a rather complete description of the sharp regularity theory for a family of heterogeneous, two-phase variational free boundary problems, Jγ min, ruled by nonlinear, p-degenerate elliptic operators. Included in such family are heterogeneous cavitation problems of Prandtl-Batchelor type; singular degenerate elliptic equations; and obstacle type systems. The Euler-Lagrange equation associated to Jγ becomes singular along the free interface \u= 0\. The degree of singularity is, in turn, dimed by the parameter γ ∈ [0,1]. For 0< γ < 1 we show local minima is locally of class C1,α for a sharp α that depends on dimension, p and γ. For γ = 0 we obtain a quantitative, asymptotically optimal result, which assures that local minima are Log-Lipschitz continuous. The results proven in this article are new even in the classical context of linear, nondegenerate equations.